Admittance

{{complex Z}}

The impedance, {{mvar|Z}}, is composed of real and imaginary parts,

$$Z\; =\; R\; +\; jX\; \backslash ,,$$

where

• {{mvar|R}} is the resistance (ohms); and
• {{mvar|X}} is the reactance (ohms).

$$Y\; =\; Z^\{-1\}=\; \backslash frac\{1\}\{R\; +\; jX\}\; =\; \backslash left(\; \backslash frac\{1\}\{R^2\; +\; X^2\}\; \backslash right)\; \backslash left(R\; -\; jX\backslash right)$$

Admittance, just like impedance, is a complex number, made up of a real part (the conductance, {{mvar|G}}), and an imaginary part (the susceptance, {{mvar|B}}), thus:

$$Y\; =\; G\; +\; jB\; \backslash ,,$$

where {{mvar|G}} (conductance) and {{mvar|B}} (susceptance) are given by:

$$\backslash begin\{align\}$$

G &= \mathrm{Re}(Y) = \frac{R}{R^2 + X^2}\,, \\

B &= \mathrm{Im}(Y) = -\frac{X}{R^2 + X^2}\,.

\end{align}

The magnitude and phase of the admittance are given by:

$$\backslash begin\{align\}$$

\left | Y \right | &= \sqrt{G^2 + B^2} = \frac{1}{\sqrt{R^2 + X^2}} \\

\angle Y &= \arctan \left( \frac{B}{G} \right) = \arctan \left( -\frac{X}{R} \right)\,,

\end{align}

where

• {{mvar|G}} is the conductance, measured in siemens; and
• {{mvar|B}} is the susceptance, also measured in siemens.

Note that (as shown above) the signs of reactances become reversed in the admittance domain; i.e. capacitive susceptance is positive and inductive susceptance is negative.

In the context of electrical modeling of transformers and transmission lines, shunt components that provide paths of least resistance in certain models are generally specified in terms of their admittance. Each side of most transformer models contains shunt components which model magnetizing current and core losses. These shunt components can be referenced to the primary or secondary side. For simplified transformer analysis, admittance from shunt elements can be neglected. When shunt components have non-negligible effects on system operation, the shunt admittance must be considered. In the diagram below, all shunt admittances are referred to the primary side. The real and imaginary components of the shunt admittance, conductance and susceptance, are represented by {{math|G{{sub|c}}}} and {{mvar|B}}, respectively.{{Cite book|title=Power System Analysis|last1=Grainger|first1=John J.|last2=Stevenson|first2=William D.|publisher=McGraw-Hill|year=1994|location=New York}}

File:Transformer Model.png

Transmission lines can span hundreds of kilometers, over which the line's capacitance can affect voltage levels. For short length transmission line analysis, which applies to lines shorter than {{convert|80|km|mi}}, this capacitance can be ignored and shunt components are not necessary in the model. Lines from {{convert|80|to about|250|km|mi}}, generally considered to be in the medium-line category, contain a shunt admittance governed byJ. Glover, M. Sarma, and T. Overbye, Power System Analysis and Design, Fifth Edition, Cengage Learning, Connecticut, 2012, {{ISBN|978-1-111-42577-7}}, Chapter 5 Transmission Lines: Steady-State Operation{{Cite web|title=Equivalent- π Representation of a Long Line|url=http://nptel.ac.in/courses/Webcourse-contents/IIT-KANPUR/power-system/chapter_2/2_7.html|last=Ghosh|first=Arindam|access-date=30 Apr 2018}}

$$Y=yl=j\backslash omega\; Cl\backslash ,,$$

where

• {{mvar|Y}} is the total shunt admittance;
• {{mvar|y}} is the shunt admittance per unit length;
• {{mvar|l}} is the length of the transmission line; and
• {{mvar|C}} is the capacitance of the line.

File:Long Transmission Line Model.png

{{Wiktionary|admittance}}

• Nodal admittance matrix
• SI electromagnetism units
• Immittance

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Category:Physical quantities

Category:Electrical resistance and conductance